Properties

Label 671.2.a.c.1.8
Level $671$
Weight $2$
Character 671.1
Self dual yes
Analytic conductor $5.358$
Analytic rank $0$
Dimension $19$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [671,2,Mod(1,671)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(671, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("671.1");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 671 = 11 \cdot 61 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 671.a (trivial)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(5.35796197563\)
Analytic rank: \(0\)
Dimension: \(19\)
Coefficient field: \(\mathbb{Q}[x]/(x^{19} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{19} - 5 x^{18} - 18 x^{17} + 122 x^{16} + 78 x^{15} - 1177 x^{14} + 387 x^{13} + 5755 x^{12} + \cdots - 43 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.8
Root \(-0.436741\) of defining polynomial
Character \(\chi\) \(=\) 671.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-0.436741 q^{2} -0.0103706 q^{3} -1.80926 q^{4} +3.47884 q^{5} +0.00452927 q^{6} -1.93516 q^{7} +1.66366 q^{8} -2.99989 q^{9} +O(q^{10})\) \(q-0.436741 q^{2} -0.0103706 q^{3} -1.80926 q^{4} +3.47884 q^{5} +0.00452927 q^{6} -1.93516 q^{7} +1.66366 q^{8} -2.99989 q^{9} -1.51935 q^{10} +1.00000 q^{11} +0.0187631 q^{12} +4.56403 q^{13} +0.845165 q^{14} -0.0360777 q^{15} +2.89193 q^{16} +2.96582 q^{17} +1.31017 q^{18} -4.35587 q^{19} -6.29411 q^{20} +0.0200689 q^{21} -0.436741 q^{22} +6.48962 q^{23} -0.0172532 q^{24} +7.10230 q^{25} -1.99330 q^{26} +0.0622226 q^{27} +3.50121 q^{28} +8.12635 q^{29} +0.0157566 q^{30} -7.92562 q^{31} -4.59034 q^{32} -0.0103706 q^{33} -1.29529 q^{34} -6.73212 q^{35} +5.42758 q^{36} -1.05106 q^{37} +1.90239 q^{38} -0.0473318 q^{39} +5.78759 q^{40} +9.87724 q^{41} -0.00876488 q^{42} +0.495326 q^{43} -1.80926 q^{44} -10.4361 q^{45} -2.83428 q^{46} +10.4314 q^{47} -0.0299911 q^{48} -3.25514 q^{49} -3.10186 q^{50} -0.0307574 q^{51} -8.25751 q^{52} +11.7850 q^{53} -0.0271751 q^{54} +3.47884 q^{55} -3.21945 q^{56} +0.0451731 q^{57} -3.54911 q^{58} -1.04645 q^{59} +0.0652738 q^{60} -1.00000 q^{61} +3.46144 q^{62} +5.80529 q^{63} -3.77907 q^{64} +15.8775 q^{65} +0.00452927 q^{66} +6.10340 q^{67} -5.36593 q^{68} -0.0673013 q^{69} +2.94019 q^{70} +0.0603962 q^{71} -4.99079 q^{72} +2.52552 q^{73} +0.459042 q^{74} -0.0736552 q^{75} +7.88089 q^{76} -1.93516 q^{77} +0.0206717 q^{78} +5.40838 q^{79} +10.0605 q^{80} +8.99903 q^{81} -4.31379 q^{82} +10.9265 q^{83} -0.0363097 q^{84} +10.3176 q^{85} -0.216329 q^{86} -0.0842753 q^{87} +1.66366 q^{88} -18.5756 q^{89} +4.55788 q^{90} -8.83215 q^{91} -11.7414 q^{92} +0.0821935 q^{93} -4.55580 q^{94} -15.1534 q^{95} +0.0476046 q^{96} -17.6748 q^{97} +1.42165 q^{98} -2.99989 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 19 q + 5 q^{2} + 23 q^{4} + q^{6} + 9 q^{7} + 9 q^{8} + 29 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 19 q + 5 q^{2} + 23 q^{4} + q^{6} + 9 q^{7} + 9 q^{8} + 29 q^{9} + 7 q^{10} + 19 q^{11} - 4 q^{12} + 8 q^{13} - 11 q^{14} - 5 q^{15} + 31 q^{16} + 9 q^{17} + 10 q^{18} + 17 q^{19} - 6 q^{20} + 18 q^{21} + 5 q^{22} - 10 q^{23} + 26 q^{24} + 45 q^{25} + 5 q^{26} - 33 q^{27} + 36 q^{28} + 27 q^{29} - 30 q^{30} + 7 q^{31} + 8 q^{32} - 5 q^{34} + 17 q^{35} + 38 q^{36} + 20 q^{37} - 37 q^{38} + 24 q^{39} + 10 q^{40} + 19 q^{41} + 21 q^{42} + 20 q^{43} + 23 q^{44} - 32 q^{45} + 41 q^{46} - 19 q^{47} + 5 q^{48} + 42 q^{49} + 36 q^{50} + 47 q^{51} - 28 q^{52} + 3 q^{53} - 33 q^{54} - 44 q^{56} + 11 q^{57} + 23 q^{58} - 28 q^{59} - 96 q^{60} - 19 q^{61} - 11 q^{62} - 32 q^{63} + 47 q^{64} + 25 q^{65} + q^{66} + 3 q^{67} + 38 q^{68} + 3 q^{70} - 19 q^{71} + 34 q^{72} + 20 q^{73} - 22 q^{74} - 50 q^{75} - 25 q^{76} + 9 q^{77} - 94 q^{78} + 69 q^{79} - 36 q^{80} + 47 q^{81} - 61 q^{82} + q^{83} - 28 q^{84} + 24 q^{85} - 27 q^{86} - 58 q^{87} + 9 q^{88} + 36 q^{90} + 24 q^{91} - 67 q^{92} - 14 q^{93} + 64 q^{94} - 3 q^{95} - 26 q^{96} + 21 q^{97} - 87 q^{98} + 29 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Coefficient data

For each \(n\) we display the coefficients of the \(q\)-expansion \(a_n\), the Satake parameters \(\alpha_p\), and the Satake angles \(\theta_p = \textrm{Arg}(\alpha_p)\).



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.436741 −0.308822 −0.154411 0.988007i \(-0.549348\pi\)
−0.154411 + 0.988007i \(0.549348\pi\)
\(3\) −0.0103706 −0.00598748 −0.00299374 0.999996i \(-0.500953\pi\)
−0.00299374 + 0.999996i \(0.500953\pi\)
\(4\) −1.80926 −0.904629
\(5\) 3.47884 1.55578 0.777891 0.628399i \(-0.216289\pi\)
0.777891 + 0.628399i \(0.216289\pi\)
\(6\) 0.00452927 0.00184907
\(7\) −1.93516 −0.731424 −0.365712 0.930728i \(-0.619174\pi\)
−0.365712 + 0.930728i \(0.619174\pi\)
\(8\) 1.66366 0.588192
\(9\) −2.99989 −0.999964
\(10\) −1.51935 −0.480460
\(11\) 1.00000 0.301511
\(12\) 0.0187631 0.00541645
\(13\) 4.56403 1.26583 0.632917 0.774220i \(-0.281857\pi\)
0.632917 + 0.774220i \(0.281857\pi\)
\(14\) 0.845165 0.225880
\(15\) −0.0360777 −0.00931522
\(16\) 2.89193 0.722982
\(17\) 2.96582 0.719316 0.359658 0.933084i \(-0.382893\pi\)
0.359658 + 0.933084i \(0.382893\pi\)
\(18\) 1.31017 0.308811
\(19\) −4.35587 −0.999305 −0.499653 0.866226i \(-0.666539\pi\)
−0.499653 + 0.866226i \(0.666539\pi\)
\(20\) −6.29411 −1.40741
\(21\) 0.0200689 0.00437938
\(22\) −0.436741 −0.0931134
\(23\) 6.48962 1.35318 0.676589 0.736360i \(-0.263457\pi\)
0.676589 + 0.736360i \(0.263457\pi\)
\(24\) −0.0172532 −0.00352179
\(25\) 7.10230 1.42046
\(26\) −1.99330 −0.390918
\(27\) 0.0622226 0.0119747
\(28\) 3.50121 0.661667
\(29\) 8.12635 1.50903 0.754513 0.656286i \(-0.227873\pi\)
0.754513 + 0.656286i \(0.227873\pi\)
\(30\) 0.0157566 0.00287675
\(31\) −7.92562 −1.42348 −0.711741 0.702442i \(-0.752093\pi\)
−0.711741 + 0.702442i \(0.752093\pi\)
\(32\) −4.59034 −0.811465
\(33\) −0.0103706 −0.00180529
\(34\) −1.29529 −0.222141
\(35\) −6.73212 −1.13794
\(36\) 5.42758 0.904596
\(37\) −1.05106 −0.172794 −0.0863970 0.996261i \(-0.527535\pi\)
−0.0863970 + 0.996261i \(0.527535\pi\)
\(38\) 1.90239 0.308608
\(39\) −0.0473318 −0.00757915
\(40\) 5.78759 0.915098
\(41\) 9.87724 1.54257 0.771283 0.636493i \(-0.219615\pi\)
0.771283 + 0.636493i \(0.219615\pi\)
\(42\) −0.00876488 −0.00135245
\(43\) 0.495326 0.0755365 0.0377683 0.999287i \(-0.487975\pi\)
0.0377683 + 0.999287i \(0.487975\pi\)
\(44\) −1.80926 −0.272756
\(45\) −10.4361 −1.55573
\(46\) −2.83428 −0.417892
\(47\) 10.4314 1.52157 0.760785 0.649004i \(-0.224814\pi\)
0.760785 + 0.649004i \(0.224814\pi\)
\(48\) −0.0299911 −0.00432884
\(49\) −3.25514 −0.465020
\(50\) −3.10186 −0.438669
\(51\) −0.0307574 −0.00430689
\(52\) −8.25751 −1.14511
\(53\) 11.7850 1.61879 0.809395 0.587265i \(-0.199795\pi\)
0.809395 + 0.587265i \(0.199795\pi\)
\(54\) −0.0271751 −0.00369807
\(55\) 3.47884 0.469086
\(56\) −3.21945 −0.430217
\(57\) 0.0451731 0.00598332
\(58\) −3.54911 −0.466020
\(59\) −1.04645 −0.136236 −0.0681179 0.997677i \(-0.521699\pi\)
−0.0681179 + 0.997677i \(0.521699\pi\)
\(60\) 0.0652738 0.00842681
\(61\) −1.00000 −0.128037
\(62\) 3.46144 0.439603
\(63\) 5.80529 0.731397
\(64\) −3.77907 −0.472384
\(65\) 15.8775 1.96936
\(66\) 0.00452927 0.000557515 0
\(67\) 6.10340 0.745649 0.372825 0.927902i \(-0.378389\pi\)
0.372825 + 0.927902i \(0.378389\pi\)
\(68\) −5.36593 −0.650714
\(69\) −0.0673013 −0.00810213
\(70\) 2.94019 0.351420
\(71\) 0.0603962 0.00716771 0.00358386 0.999994i \(-0.498859\pi\)
0.00358386 + 0.999994i \(0.498859\pi\)
\(72\) −4.99079 −0.588171
\(73\) 2.52552 0.295590 0.147795 0.989018i \(-0.452782\pi\)
0.147795 + 0.989018i \(0.452782\pi\)
\(74\) 0.459042 0.0533626
\(75\) −0.0736552 −0.00850497
\(76\) 7.88089 0.904000
\(77\) −1.93516 −0.220533
\(78\) 0.0206717 0.00234061
\(79\) 5.40838 0.608491 0.304245 0.952594i \(-0.401596\pi\)
0.304245 + 0.952594i \(0.401596\pi\)
\(80\) 10.0605 1.12480
\(81\) 8.99903 0.999892
\(82\) −4.31379 −0.476378
\(83\) 10.9265 1.19934 0.599672 0.800246i \(-0.295298\pi\)
0.599672 + 0.800246i \(0.295298\pi\)
\(84\) −0.0363097 −0.00396172
\(85\) 10.3176 1.11910
\(86\) −0.216329 −0.0233274
\(87\) −0.0842753 −0.00903526
\(88\) 1.66366 0.177346
\(89\) −18.5756 −1.96901 −0.984503 0.175368i \(-0.943888\pi\)
−0.984503 + 0.175368i \(0.943888\pi\)
\(90\) 4.55788 0.480443
\(91\) −8.83215 −0.925861
\(92\) −11.7414 −1.22412
\(93\) 0.0821935 0.00852307
\(94\) −4.55580 −0.469895
\(95\) −15.1534 −1.55470
\(96\) 0.0476046 0.00485863
\(97\) −17.6748 −1.79460 −0.897300 0.441421i \(-0.854474\pi\)
−0.897300 + 0.441421i \(0.854474\pi\)
\(98\) 1.42165 0.143608
\(99\) −2.99989 −0.301501
\(100\) −12.8499 −1.28499
\(101\) −5.63429 −0.560633 −0.280317 0.959908i \(-0.590439\pi\)
−0.280317 + 0.959908i \(0.590439\pi\)
\(102\) 0.0134330 0.00133006
\(103\) −16.7201 −1.64748 −0.823738 0.566971i \(-0.808115\pi\)
−0.823738 + 0.566971i \(0.808115\pi\)
\(104\) 7.59298 0.744553
\(105\) 0.0698163 0.00681337
\(106\) −5.14697 −0.499918
\(107\) −10.2226 −0.988261 −0.494130 0.869388i \(-0.664513\pi\)
−0.494130 + 0.869388i \(0.664513\pi\)
\(108\) −0.112577 −0.0108327
\(109\) 8.04155 0.770241 0.385120 0.922866i \(-0.374160\pi\)
0.385120 + 0.922866i \(0.374160\pi\)
\(110\) −1.51935 −0.144864
\(111\) 0.0109002 0.00103460
\(112\) −5.59636 −0.528806
\(113\) −5.03833 −0.473967 −0.236983 0.971514i \(-0.576159\pi\)
−0.236983 + 0.971514i \(0.576159\pi\)
\(114\) −0.0197289 −0.00184778
\(115\) 22.5763 2.10525
\(116\) −14.7027 −1.36511
\(117\) −13.6916 −1.26579
\(118\) 0.457026 0.0420726
\(119\) −5.73934 −0.526125
\(120\) −0.0600209 −0.00547913
\(121\) 1.00000 0.0909091
\(122\) 0.436741 0.0395406
\(123\) −0.102433 −0.00923608
\(124\) 14.3395 1.28772
\(125\) 7.31354 0.654143
\(126\) −2.53540 −0.225872
\(127\) 12.0779 1.07174 0.535871 0.844300i \(-0.319983\pi\)
0.535871 + 0.844300i \(0.319983\pi\)
\(128\) 10.8311 0.957347
\(129\) −0.00513684 −0.000452273 0
\(130\) −6.93435 −0.608183
\(131\) −19.0023 −1.66024 −0.830119 0.557587i \(-0.811727\pi\)
−0.830119 + 0.557587i \(0.811727\pi\)
\(132\) 0.0187631 0.00163312
\(133\) 8.42933 0.730915
\(134\) −2.66560 −0.230273
\(135\) 0.216462 0.0186301
\(136\) 4.93410 0.423096
\(137\) −22.4442 −1.91754 −0.958771 0.284180i \(-0.908279\pi\)
−0.958771 + 0.284180i \(0.908279\pi\)
\(138\) 0.0293932 0.00250212
\(139\) −12.2835 −1.04188 −0.520938 0.853594i \(-0.674418\pi\)
−0.520938 + 0.853594i \(0.674418\pi\)
\(140\) 12.1801 1.02941
\(141\) −0.108180 −0.00911037
\(142\) −0.0263775 −0.00221355
\(143\) 4.56403 0.381663
\(144\) −8.67548 −0.722956
\(145\) 28.2702 2.34771
\(146\) −1.10300 −0.0912847
\(147\) 0.0337578 0.00278429
\(148\) 1.90165 0.156314
\(149\) 19.8821 1.62880 0.814401 0.580302i \(-0.197065\pi\)
0.814401 + 0.580302i \(0.197065\pi\)
\(150\) 0.0321682 0.00262652
\(151\) −10.5885 −0.861678 −0.430839 0.902429i \(-0.641782\pi\)
−0.430839 + 0.902429i \(0.641782\pi\)
\(152\) −7.24668 −0.587783
\(153\) −8.89713 −0.719290
\(154\) 0.845165 0.0681053
\(155\) −27.5719 −2.21463
\(156\) 0.0856354 0.00685632
\(157\) −7.05272 −0.562868 −0.281434 0.959581i \(-0.590810\pi\)
−0.281434 + 0.959581i \(0.590810\pi\)
\(158\) −2.36206 −0.187915
\(159\) −0.122217 −0.00969247
\(160\) −15.9690 −1.26246
\(161\) −12.5585 −0.989747
\(162\) −3.93024 −0.308789
\(163\) 5.13074 0.401870 0.200935 0.979605i \(-0.435602\pi\)
0.200935 + 0.979605i \(0.435602\pi\)
\(164\) −17.8705 −1.39545
\(165\) −0.0360777 −0.00280864
\(166\) −4.77207 −0.370384
\(167\) 22.6642 1.75381 0.876903 0.480668i \(-0.159606\pi\)
0.876903 + 0.480668i \(0.159606\pi\)
\(168\) 0.0333877 0.00257592
\(169\) 7.83036 0.602336
\(170\) −4.50611 −0.345603
\(171\) 13.0671 0.999269
\(172\) −0.896173 −0.0683325
\(173\) 12.3401 0.938201 0.469100 0.883145i \(-0.344578\pi\)
0.469100 + 0.883145i \(0.344578\pi\)
\(174\) 0.0368064 0.00279029
\(175\) −13.7441 −1.03896
\(176\) 2.89193 0.217987
\(177\) 0.0108523 0.000815709 0
\(178\) 8.11270 0.608073
\(179\) 4.14843 0.310069 0.155034 0.987909i \(-0.450451\pi\)
0.155034 + 0.987909i \(0.450451\pi\)
\(180\) 18.8817 1.40736
\(181\) 15.7435 1.17021 0.585104 0.810958i \(-0.301054\pi\)
0.585104 + 0.810958i \(0.301054\pi\)
\(182\) 3.85736 0.285926
\(183\) 0.0103706 0.000766618 0
\(184\) 10.7965 0.795928
\(185\) −3.65648 −0.268830
\(186\) −0.0358972 −0.00263211
\(187\) 2.96582 0.216882
\(188\) −18.8730 −1.37646
\(189\) −0.120411 −0.00875861
\(190\) 6.61808 0.480126
\(191\) −14.6638 −1.06104 −0.530518 0.847674i \(-0.678003\pi\)
−0.530518 + 0.847674i \(0.678003\pi\)
\(192\) 0.0391913 0.00282839
\(193\) −19.6530 −1.41466 −0.707328 0.706885i \(-0.750100\pi\)
−0.707328 + 0.706885i \(0.750100\pi\)
\(194\) 7.71928 0.554212
\(195\) −0.164660 −0.0117915
\(196\) 5.88938 0.420670
\(197\) −4.17761 −0.297643 −0.148821 0.988864i \(-0.547548\pi\)
−0.148821 + 0.988864i \(0.547548\pi\)
\(198\) 1.31017 0.0931101
\(199\) −14.5828 −1.03375 −0.516875 0.856061i \(-0.672905\pi\)
−0.516875 + 0.856061i \(0.672905\pi\)
\(200\) 11.8158 0.835502
\(201\) −0.0632961 −0.00446456
\(202\) 2.46072 0.173136
\(203\) −15.7258 −1.10374
\(204\) 0.0556480 0.00389614
\(205\) 34.3613 2.39990
\(206\) 7.30233 0.508777
\(207\) −19.4682 −1.35313
\(208\) 13.1988 0.915175
\(209\) −4.35587 −0.301302
\(210\) −0.0304916 −0.00210412
\(211\) −11.4294 −0.786830 −0.393415 0.919361i \(-0.628706\pi\)
−0.393415 + 0.919361i \(0.628706\pi\)
\(212\) −21.3220 −1.46440
\(213\) −0.000626346 0 −4.29165e−5 0
\(214\) 4.46464 0.305197
\(215\) 1.72316 0.117518
\(216\) 0.103517 0.00704344
\(217\) 15.3374 1.04117
\(218\) −3.51207 −0.237868
\(219\) −0.0261912 −0.00176984
\(220\) −6.29411 −0.424349
\(221\) 13.5361 0.910535
\(222\) −0.00476055 −0.000319507 0
\(223\) 3.82865 0.256385 0.128193 0.991749i \(-0.459082\pi\)
0.128193 + 0.991749i \(0.459082\pi\)
\(224\) 8.88306 0.593524
\(225\) −21.3061 −1.42041
\(226\) 2.20044 0.146371
\(227\) −10.1929 −0.676527 −0.338264 0.941051i \(-0.609840\pi\)
−0.338264 + 0.941051i \(0.609840\pi\)
\(228\) −0.0817297 −0.00541268
\(229\) 4.69673 0.310369 0.155184 0.987886i \(-0.450403\pi\)
0.155184 + 0.987886i \(0.450403\pi\)
\(230\) −9.85999 −0.650149
\(231\) 0.0200689 0.00132043
\(232\) 13.5195 0.887596
\(233\) −3.20209 −0.209776 −0.104888 0.994484i \(-0.533448\pi\)
−0.104888 + 0.994484i \(0.533448\pi\)
\(234\) 5.97968 0.390904
\(235\) 36.2890 2.36723
\(236\) 1.89329 0.123243
\(237\) −0.0560883 −0.00364333
\(238\) 2.50660 0.162479
\(239\) −15.0328 −0.972388 −0.486194 0.873851i \(-0.661615\pi\)
−0.486194 + 0.873851i \(0.661615\pi\)
\(240\) −0.104334 −0.00673474
\(241\) 10.7597 0.693092 0.346546 0.938033i \(-0.387355\pi\)
0.346546 + 0.938033i \(0.387355\pi\)
\(242\) −0.436741 −0.0280747
\(243\) −0.279993 −0.0179616
\(244\) 1.80926 0.115826
\(245\) −11.3241 −0.723469
\(246\) 0.0447367 0.00285231
\(247\) −19.8803 −1.26495
\(248\) −13.1855 −0.837281
\(249\) −0.113315 −0.00718105
\(250\) −3.19412 −0.202014
\(251\) 25.8084 1.62901 0.814504 0.580157i \(-0.197009\pi\)
0.814504 + 0.580157i \(0.197009\pi\)
\(252\) −10.5033 −0.661643
\(253\) 6.48962 0.407999
\(254\) −5.27492 −0.330978
\(255\) −0.107000 −0.00670059
\(256\) 2.82774 0.176734
\(257\) −23.8547 −1.48801 −0.744007 0.668172i \(-0.767077\pi\)
−0.744007 + 0.668172i \(0.767077\pi\)
\(258\) 0.00224347 0.000139672 0
\(259\) 2.03398 0.126386
\(260\) −28.7265 −1.78154
\(261\) −24.3782 −1.50897
\(262\) 8.29907 0.512718
\(263\) −15.0382 −0.927294 −0.463647 0.886020i \(-0.653459\pi\)
−0.463647 + 0.886020i \(0.653459\pi\)
\(264\) −0.0172532 −0.00106186
\(265\) 40.9980 2.51848
\(266\) −3.68143 −0.225723
\(267\) 0.192640 0.0117894
\(268\) −11.0426 −0.674536
\(269\) 5.09501 0.310648 0.155324 0.987864i \(-0.450358\pi\)
0.155324 + 0.987864i \(0.450358\pi\)
\(270\) −0.0945378 −0.00575339
\(271\) −13.6962 −0.831986 −0.415993 0.909368i \(-0.636566\pi\)
−0.415993 + 0.909368i \(0.636566\pi\)
\(272\) 8.57693 0.520053
\(273\) 0.0915949 0.00554357
\(274\) 9.80231 0.592179
\(275\) 7.10230 0.428285
\(276\) 0.121765 0.00732942
\(277\) 12.0575 0.724465 0.362233 0.932088i \(-0.382015\pi\)
0.362233 + 0.932088i \(0.382015\pi\)
\(278\) 5.36472 0.321754
\(279\) 23.7760 1.42343
\(280\) −11.1999 −0.669324
\(281\) 28.6925 1.71165 0.855827 0.517263i \(-0.173049\pi\)
0.855827 + 0.517263i \(0.173049\pi\)
\(282\) 0.0472464 0.00281349
\(283\) −4.02652 −0.239352 −0.119676 0.992813i \(-0.538186\pi\)
−0.119676 + 0.992813i \(0.538186\pi\)
\(284\) −0.109272 −0.00648412
\(285\) 0.157150 0.00930874
\(286\) −1.99330 −0.117866
\(287\) −19.1141 −1.12827
\(288\) 13.7705 0.811436
\(289\) −8.20393 −0.482584
\(290\) −12.3468 −0.725026
\(291\) 0.183298 0.0107451
\(292\) −4.56932 −0.267399
\(293\) 1.96841 0.114996 0.0574979 0.998346i \(-0.481688\pi\)
0.0574979 + 0.998346i \(0.481688\pi\)
\(294\) −0.0147434 −0.000859852 0
\(295\) −3.64042 −0.211953
\(296\) −1.74861 −0.101636
\(297\) 0.0622226 0.00361052
\(298\) −8.68331 −0.503010
\(299\) 29.6188 1.71290
\(300\) 0.133261 0.00769384
\(301\) −0.958538 −0.0552492
\(302\) 4.62442 0.266105
\(303\) 0.0584311 0.00335678
\(304\) −12.5969 −0.722480
\(305\) −3.47884 −0.199198
\(306\) 3.88574 0.222133
\(307\) 23.5477 1.34394 0.671969 0.740580i \(-0.265449\pi\)
0.671969 + 0.740580i \(0.265449\pi\)
\(308\) 3.50121 0.199500
\(309\) 0.173397 0.00986423
\(310\) 12.0418 0.683927
\(311\) 21.8661 1.23991 0.619956 0.784636i \(-0.287150\pi\)
0.619956 + 0.784636i \(0.287150\pi\)
\(312\) −0.0787439 −0.00445800
\(313\) −8.85138 −0.500310 −0.250155 0.968206i \(-0.580482\pi\)
−0.250155 + 0.968206i \(0.580482\pi\)
\(314\) 3.08021 0.173826
\(315\) 20.1956 1.13790
\(316\) −9.78516 −0.550458
\(317\) 0.553452 0.0310849 0.0155425 0.999879i \(-0.495052\pi\)
0.0155425 + 0.999879i \(0.495052\pi\)
\(318\) 0.0533773 0.00299325
\(319\) 8.12635 0.454988
\(320\) −13.1468 −0.734927
\(321\) 0.106015 0.00591719
\(322\) 5.48480 0.305656
\(323\) −12.9187 −0.718816
\(324\) −16.2816 −0.904532
\(325\) 32.4151 1.79807
\(326\) −2.24080 −0.124106
\(327\) −0.0833959 −0.00461180
\(328\) 16.4323 0.907324
\(329\) −20.1864 −1.11291
\(330\) 0.0157566 0.000867371 0
\(331\) −2.04463 −0.112383 −0.0561915 0.998420i \(-0.517896\pi\)
−0.0561915 + 0.998420i \(0.517896\pi\)
\(332\) −19.7689 −1.08496
\(333\) 3.15308 0.172788
\(334\) −9.89836 −0.541614
\(335\) 21.2327 1.16007
\(336\) 0.0580377 0.00316622
\(337\) −4.08881 −0.222732 −0.111366 0.993779i \(-0.535523\pi\)
−0.111366 + 0.993779i \(0.535523\pi\)
\(338\) −3.41984 −0.186015
\(339\) 0.0522506 0.00283787
\(340\) −18.6672 −1.01237
\(341\) −7.92562 −0.429196
\(342\) −5.70695 −0.308597
\(343\) 19.8454 1.07155
\(344\) 0.824053 0.0444300
\(345\) −0.234130 −0.0126052
\(346\) −5.38942 −0.289737
\(347\) −3.85730 −0.207071 −0.103535 0.994626i \(-0.533015\pi\)
−0.103535 + 0.994626i \(0.533015\pi\)
\(348\) 0.152476 0.00817355
\(349\) 22.3728 1.19759 0.598794 0.800903i \(-0.295647\pi\)
0.598794 + 0.800903i \(0.295647\pi\)
\(350\) 6.00261 0.320853
\(351\) 0.283986 0.0151580
\(352\) −4.59034 −0.244666
\(353\) −2.36325 −0.125783 −0.0628917 0.998020i \(-0.520032\pi\)
−0.0628917 + 0.998020i \(0.520032\pi\)
\(354\) −0.00473964 −0.000251909 0
\(355\) 0.210109 0.0111514
\(356\) 33.6080 1.78122
\(357\) 0.0595205 0.00315016
\(358\) −1.81179 −0.0957560
\(359\) 5.06403 0.267269 0.133635 0.991031i \(-0.457335\pi\)
0.133635 + 0.991031i \(0.457335\pi\)
\(360\) −17.3621 −0.915065
\(361\) −0.0263928 −0.00138910
\(362\) −6.87584 −0.361386
\(363\) −0.0103706 −0.000544316 0
\(364\) 15.9796 0.837560
\(365\) 8.78587 0.459873
\(366\) −0.00452927 −0.000236749 0
\(367\) −3.23910 −0.169080 −0.0845399 0.996420i \(-0.526942\pi\)
−0.0845399 + 0.996420i \(0.526942\pi\)
\(368\) 18.7675 0.978324
\(369\) −29.6307 −1.54251
\(370\) 1.59693 0.0830206
\(371\) −22.8059 −1.18402
\(372\) −0.148709 −0.00771022
\(373\) −3.70872 −0.192030 −0.0960150 0.995380i \(-0.530610\pi\)
−0.0960150 + 0.995380i \(0.530610\pi\)
\(374\) −1.29529 −0.0669780
\(375\) −0.0758460 −0.00391667
\(376\) 17.3542 0.894975
\(377\) 37.0889 1.91018
\(378\) 0.0525884 0.00270485
\(379\) −21.3298 −1.09564 −0.547820 0.836596i \(-0.684542\pi\)
−0.547820 + 0.836596i \(0.684542\pi\)
\(380\) 27.4163 1.40643
\(381\) −0.125256 −0.00641704
\(382\) 6.40428 0.327671
\(383\) 4.42601 0.226158 0.113079 0.993586i \(-0.463929\pi\)
0.113079 + 0.993586i \(0.463929\pi\)
\(384\) −0.112326 −0.00573210
\(385\) −6.73212 −0.343101
\(386\) 8.58328 0.436877
\(387\) −1.48593 −0.0755338
\(388\) 31.9782 1.62345
\(389\) 18.0980 0.917606 0.458803 0.888538i \(-0.348278\pi\)
0.458803 + 0.888538i \(0.348278\pi\)
\(390\) 0.0719135 0.00364148
\(391\) 19.2470 0.973363
\(392\) −5.41543 −0.273521
\(393\) 0.197065 0.00994064
\(394\) 1.82453 0.0919187
\(395\) 18.8149 0.946679
\(396\) 5.42758 0.272746
\(397\) 25.6066 1.28516 0.642579 0.766219i \(-0.277864\pi\)
0.642579 + 0.766219i \(0.277864\pi\)
\(398\) 6.36892 0.319245
\(399\) −0.0874173 −0.00437634
\(400\) 20.5393 1.02697
\(401\) −24.9495 −1.24592 −0.622958 0.782255i \(-0.714069\pi\)
−0.622958 + 0.782255i \(0.714069\pi\)
\(402\) 0.0276440 0.00137876
\(403\) −36.1727 −1.80189
\(404\) 10.1939 0.507165
\(405\) 31.3062 1.55562
\(406\) 6.86811 0.340858
\(407\) −1.05106 −0.0520993
\(408\) −0.0511697 −0.00253328
\(409\) 26.3498 1.30292 0.651458 0.758685i \(-0.274158\pi\)
0.651458 + 0.758685i \(0.274158\pi\)
\(410\) −15.0070 −0.741141
\(411\) 0.232761 0.0114812
\(412\) 30.2509 1.49035
\(413\) 2.02505 0.0996460
\(414\) 8.50253 0.417877
\(415\) 38.0117 1.86592
\(416\) −20.9504 −1.02718
\(417\) 0.127388 0.00623821
\(418\) 1.90239 0.0930487
\(419\) 21.0273 1.02725 0.513626 0.858014i \(-0.328302\pi\)
0.513626 + 0.858014i \(0.328302\pi\)
\(420\) −0.126316 −0.00616357
\(421\) −24.6599 −1.20185 −0.600924 0.799306i \(-0.705201\pi\)
−0.600924 + 0.799306i \(0.705201\pi\)
\(422\) 4.99167 0.242991
\(423\) −31.2930 −1.52152
\(424\) 19.6061 0.952159
\(425\) 21.0641 1.02176
\(426\) 0.000273551 0 1.32536e−5 0
\(427\) 1.93516 0.0936492
\(428\) 18.4954 0.894009
\(429\) −0.0473318 −0.00228520
\(430\) −0.752573 −0.0362923
\(431\) 34.0658 1.64089 0.820447 0.571723i \(-0.193725\pi\)
0.820447 + 0.571723i \(0.193725\pi\)
\(432\) 0.179943 0.00865753
\(433\) −26.2258 −1.26033 −0.630165 0.776461i \(-0.717013\pi\)
−0.630165 + 0.776461i \(0.717013\pi\)
\(434\) −6.69845 −0.321536
\(435\) −0.293180 −0.0140569
\(436\) −14.5492 −0.696782
\(437\) −28.2679 −1.35224
\(438\) 0.0114388 0.000546565 0
\(439\) −31.2884 −1.49331 −0.746657 0.665209i \(-0.768343\pi\)
−0.746657 + 0.665209i \(0.768343\pi\)
\(440\) 5.78759 0.275913
\(441\) 9.76506 0.465003
\(442\) −5.91175 −0.281193
\(443\) −4.24854 −0.201854 −0.100927 0.994894i \(-0.532181\pi\)
−0.100927 + 0.994894i \(0.532181\pi\)
\(444\) −0.0197213 −0.000935929 0
\(445\) −64.6213 −3.06334
\(446\) −1.67213 −0.0791775
\(447\) −0.206189 −0.00975242
\(448\) 7.31313 0.345513
\(449\) 18.4688 0.871594 0.435797 0.900045i \(-0.356467\pi\)
0.435797 + 0.900045i \(0.356467\pi\)
\(450\) 9.30525 0.438654
\(451\) 9.87724 0.465101
\(452\) 9.11564 0.428764
\(453\) 0.109809 0.00515928
\(454\) 4.45166 0.208927
\(455\) −30.7256 −1.44044
\(456\) 0.0751525 0.00351934
\(457\) 28.5285 1.33451 0.667254 0.744830i \(-0.267469\pi\)
0.667254 + 0.744830i \(0.267469\pi\)
\(458\) −2.05125 −0.0958488
\(459\) 0.184541 0.00861363
\(460\) −40.8464 −1.90447
\(461\) −32.7053 −1.52324 −0.761620 0.648024i \(-0.775596\pi\)
−0.761620 + 0.648024i \(0.775596\pi\)
\(462\) −0.00876488 −0.000407779 0
\(463\) −17.7971 −0.827102 −0.413551 0.910481i \(-0.635712\pi\)
−0.413551 + 0.910481i \(0.635712\pi\)
\(464\) 23.5008 1.09100
\(465\) 0.285938 0.0132600
\(466\) 1.39848 0.0647834
\(467\) 10.2527 0.474439 0.237220 0.971456i \(-0.423764\pi\)
0.237220 + 0.971456i \(0.423764\pi\)
\(468\) 24.7716 1.14507
\(469\) −11.8111 −0.545386
\(470\) −15.8489 −0.731054
\(471\) 0.0731411 0.00337016
\(472\) −1.74093 −0.0801327
\(473\) 0.495326 0.0227751
\(474\) 0.0244960 0.00112514
\(475\) −30.9367 −1.41947
\(476\) 10.3840 0.475948
\(477\) −35.3536 −1.61873
\(478\) 6.56541 0.300295
\(479\) −37.5407 −1.71528 −0.857639 0.514252i \(-0.828070\pi\)
−0.857639 + 0.514252i \(0.828070\pi\)
\(480\) 0.165609 0.00755897
\(481\) −4.79709 −0.218728
\(482\) −4.69919 −0.214042
\(483\) 0.130239 0.00592609
\(484\) −1.80926 −0.0822390
\(485\) −61.4876 −2.79201
\(486\) 0.122284 0.00554693
\(487\) −23.1356 −1.04837 −0.524186 0.851604i \(-0.675630\pi\)
−0.524186 + 0.851604i \(0.675630\pi\)
\(488\) −1.66366 −0.0753102
\(489\) −0.0532089 −0.00240619
\(490\) 4.94569 0.223423
\(491\) −3.37400 −0.152267 −0.0761333 0.997098i \(-0.524257\pi\)
−0.0761333 + 0.997098i \(0.524257\pi\)
\(492\) 0.185328 0.00835522
\(493\) 24.1013 1.08547
\(494\) 8.68254 0.390646
\(495\) −10.4361 −0.469069
\(496\) −22.9203 −1.02915
\(497\) −0.116877 −0.00524263
\(498\) 0.0494893 0.00221767
\(499\) −3.50167 −0.156756 −0.0783781 0.996924i \(-0.524974\pi\)
−0.0783781 + 0.996924i \(0.524974\pi\)
\(500\) −13.2321 −0.591757
\(501\) −0.235041 −0.0105009
\(502\) −11.2716 −0.503074
\(503\) 33.4010 1.48928 0.744639 0.667468i \(-0.232622\pi\)
0.744639 + 0.667468i \(0.232622\pi\)
\(504\) 9.65801 0.430202
\(505\) −19.6008 −0.872223
\(506\) −2.83428 −0.125999
\(507\) −0.0812057 −0.00360647
\(508\) −21.8521 −0.969530
\(509\) 4.81578 0.213456 0.106728 0.994288i \(-0.465963\pi\)
0.106728 + 0.994288i \(0.465963\pi\)
\(510\) 0.0467311 0.00206929
\(511\) −4.88730 −0.216201
\(512\) −22.8973 −1.01193
\(513\) −0.271034 −0.0119664
\(514\) 10.4183 0.459532
\(515\) −58.1663 −2.56311
\(516\) 0.00929387 0.000409140 0
\(517\) 10.4314 0.458771
\(518\) −0.888323 −0.0390307
\(519\) −0.127975 −0.00561746
\(520\) 26.4147 1.15836
\(521\) −14.9388 −0.654481 −0.327241 0.944941i \(-0.606119\pi\)
−0.327241 + 0.944941i \(0.606119\pi\)
\(522\) 10.6469 0.466004
\(523\) −11.8191 −0.516812 −0.258406 0.966036i \(-0.583197\pi\)
−0.258406 + 0.966036i \(0.583197\pi\)
\(524\) 34.3800 1.50190
\(525\) 0.142535 0.00622074
\(526\) 6.56778 0.286369
\(527\) −23.5059 −1.02393
\(528\) −0.0299911 −0.00130519
\(529\) 19.1151 0.831093
\(530\) −17.9055 −0.777764
\(531\) 3.13923 0.136231
\(532\) −15.2508 −0.661207
\(533\) 45.0800 1.95263
\(534\) −0.0841337 −0.00364082
\(535\) −35.5629 −1.53752
\(536\) 10.1540 0.438585
\(537\) −0.0430218 −0.00185653
\(538\) −2.22520 −0.0959351
\(539\) −3.25514 −0.140209
\(540\) −0.391636 −0.0168533
\(541\) 23.8977 1.02744 0.513721 0.857957i \(-0.328267\pi\)
0.513721 + 0.857957i \(0.328267\pi\)
\(542\) 5.98169 0.256936
\(543\) −0.163270 −0.00700660
\(544\) −13.6141 −0.583700
\(545\) 27.9752 1.19833
\(546\) −0.0400032 −0.00171198
\(547\) 3.31882 0.141902 0.0709512 0.997480i \(-0.477397\pi\)
0.0709512 + 0.997480i \(0.477397\pi\)
\(548\) 40.6074 1.73466
\(549\) 2.99989 0.128032
\(550\) −3.10186 −0.132264
\(551\) −35.3973 −1.50798
\(552\) −0.111966 −0.00476561
\(553\) −10.4661 −0.445065
\(554\) −5.26600 −0.223731
\(555\) 0.0379200 0.00160961
\(556\) 22.2241 0.942511
\(557\) 5.44841 0.230856 0.115428 0.993316i \(-0.463176\pi\)
0.115428 + 0.993316i \(0.463176\pi\)
\(558\) −10.3839 −0.439587
\(559\) 2.26068 0.0956167
\(560\) −19.4688 −0.822708
\(561\) −0.0307574 −0.00129858
\(562\) −12.5312 −0.528597
\(563\) −2.97850 −0.125529 −0.0627643 0.998028i \(-0.519992\pi\)
−0.0627643 + 0.998028i \(0.519992\pi\)
\(564\) 0.195725 0.00824151
\(565\) −17.5275 −0.737389
\(566\) 1.75854 0.0739171
\(567\) −17.4146 −0.731345
\(568\) 0.100479 0.00421599
\(569\) −15.1867 −0.636658 −0.318329 0.947980i \(-0.603122\pi\)
−0.318329 + 0.947980i \(0.603122\pi\)
\(570\) −0.0686336 −0.00287475
\(571\) −0.197248 −0.00825458 −0.00412729 0.999991i \(-0.501314\pi\)
−0.00412729 + 0.999991i \(0.501314\pi\)
\(572\) −8.25751 −0.345264
\(573\) 0.152073 0.00635293
\(574\) 8.34790 0.348434
\(575\) 46.0912 1.92214
\(576\) 11.3368 0.472367
\(577\) −23.8728 −0.993839 −0.496919 0.867797i \(-0.665536\pi\)
−0.496919 + 0.867797i \(0.665536\pi\)
\(578\) 3.58299 0.149033
\(579\) 0.203814 0.00847023
\(580\) −51.1481 −2.12381
\(581\) −21.1447 −0.877229
\(582\) −0.0800537 −0.00331833
\(583\) 11.7850 0.488083
\(584\) 4.20160 0.173863
\(585\) −47.6308 −1.96929
\(586\) −0.859685 −0.0355132
\(587\) −25.9108 −1.06945 −0.534727 0.845025i \(-0.679585\pi\)
−0.534727 + 0.845025i \(0.679585\pi\)
\(588\) −0.0610765 −0.00251875
\(589\) 34.5230 1.42249
\(590\) 1.58992 0.0654558
\(591\) 0.0433244 0.00178213
\(592\) −3.03960 −0.124927
\(593\) 0.815514 0.0334891 0.0167446 0.999860i \(-0.494670\pi\)
0.0167446 + 0.999860i \(0.494670\pi\)
\(594\) −0.0271751 −0.00111501
\(595\) −19.9662 −0.818536
\(596\) −35.9718 −1.47346
\(597\) 0.151233 0.00618956
\(598\) −12.9357 −0.528981
\(599\) 6.38692 0.260963 0.130481 0.991451i \(-0.458348\pi\)
0.130481 + 0.991451i \(0.458348\pi\)
\(600\) −0.122537 −0.00500255
\(601\) −29.4015 −1.19931 −0.599656 0.800258i \(-0.704696\pi\)
−0.599656 + 0.800258i \(0.704696\pi\)
\(602\) 0.418632 0.0170622
\(603\) −18.3096 −0.745623
\(604\) 19.1573 0.779499
\(605\) 3.47884 0.141435
\(606\) −0.0255192 −0.00103665
\(607\) 9.41610 0.382188 0.191094 0.981572i \(-0.438797\pi\)
0.191094 + 0.981572i \(0.438797\pi\)
\(608\) 19.9949 0.810901
\(609\) 0.163087 0.00660860
\(610\) 1.51935 0.0615166
\(611\) 47.6090 1.92606
\(612\) 16.0972 0.650691
\(613\) −3.24986 −0.131261 −0.0656304 0.997844i \(-0.520906\pi\)
−0.0656304 + 0.997844i \(0.520906\pi\)
\(614\) −10.2842 −0.415038
\(615\) −0.356348 −0.0143693
\(616\) −3.21945 −0.129715
\(617\) −8.37130 −0.337016 −0.168508 0.985700i \(-0.553895\pi\)
−0.168508 + 0.985700i \(0.553895\pi\)
\(618\) −0.0757296 −0.00304629
\(619\) −8.62770 −0.346777 −0.173388 0.984854i \(-0.555472\pi\)
−0.173388 + 0.984854i \(0.555472\pi\)
\(620\) 49.8847 2.00342
\(621\) 0.403801 0.0162040
\(622\) −9.54981 −0.382913
\(623\) 35.9468 1.44018
\(624\) −0.136880 −0.00547959
\(625\) −10.0689 −0.402755
\(626\) 3.86576 0.154507
\(627\) 0.0451731 0.00180404
\(628\) 12.7602 0.509187
\(629\) −3.11726 −0.124293
\(630\) −8.82025 −0.351407
\(631\) 28.1700 1.12143 0.560716 0.828008i \(-0.310526\pi\)
0.560716 + 0.828008i \(0.310526\pi\)
\(632\) 8.99770 0.357909
\(633\) 0.118530 0.00471113
\(634\) −0.241715 −0.00959972
\(635\) 42.0171 1.66740
\(636\) 0.221123 0.00876809
\(637\) −14.8565 −0.588637
\(638\) −3.54911 −0.140510
\(639\) −0.181182 −0.00716746
\(640\) 37.6798 1.48942
\(641\) −4.34993 −0.171812 −0.0859059 0.996303i \(-0.527378\pi\)
−0.0859059 + 0.996303i \(0.527378\pi\)
\(642\) −0.0463011 −0.00182736
\(643\) 33.0246 1.30236 0.651181 0.758923i \(-0.274274\pi\)
0.651181 + 0.758923i \(0.274274\pi\)
\(644\) 22.7215 0.895354
\(645\) −0.0178702 −0.000703639 0
\(646\) 5.64213 0.221986
\(647\) −21.7241 −0.854061 −0.427031 0.904237i \(-0.640440\pi\)
−0.427031 + 0.904237i \(0.640440\pi\)
\(648\) 14.9713 0.588128
\(649\) −1.04645 −0.0410766
\(650\) −14.1570 −0.555283
\(651\) −0.159058 −0.00623398
\(652\) −9.28283 −0.363543
\(653\) −17.0226 −0.666146 −0.333073 0.942901i \(-0.608085\pi\)
−0.333073 + 0.942901i \(0.608085\pi\)
\(654\) 0.0364224 0.00142423
\(655\) −66.1058 −2.58297
\(656\) 28.5643 1.11525
\(657\) −7.57629 −0.295579
\(658\) 8.81622 0.343692
\(659\) 45.0710 1.75572 0.877858 0.478921i \(-0.158972\pi\)
0.877858 + 0.478921i \(0.158972\pi\)
\(660\) 0.0652738 0.00254078
\(661\) 17.6243 0.685504 0.342752 0.939426i \(-0.388641\pi\)
0.342752 + 0.939426i \(0.388641\pi\)
\(662\) 0.892972 0.0347063
\(663\) −0.140377 −0.00545181
\(664\) 18.1780 0.705444
\(665\) 29.3242 1.13715
\(666\) −1.37708 −0.0533607
\(667\) 52.7369 2.04198
\(668\) −41.0053 −1.58654
\(669\) −0.0397055 −0.00153510
\(670\) −9.27320 −0.358255
\(671\) −1.00000 −0.0386046
\(672\) −0.0921228 −0.00355372
\(673\) −9.44548 −0.364096 −0.182048 0.983290i \(-0.558273\pi\)
−0.182048 + 0.983290i \(0.558273\pi\)
\(674\) 1.78575 0.0687845
\(675\) 0.441923 0.0170096
\(676\) −14.1671 −0.544890
\(677\) −42.3833 −1.62892 −0.814461 0.580218i \(-0.802967\pi\)
−0.814461 + 0.580218i \(0.802967\pi\)
\(678\) −0.0228200 −0.000876396 0
\(679\) 34.2036 1.31261
\(680\) 17.1649 0.658245
\(681\) 0.105707 0.00405069
\(682\) 3.46144 0.132545
\(683\) −7.58574 −0.290260 −0.145130 0.989413i \(-0.546360\pi\)
−0.145130 + 0.989413i \(0.546360\pi\)
\(684\) −23.6418 −0.903968
\(685\) −78.0798 −2.98328
\(686\) −8.66728 −0.330918
\(687\) −0.0487080 −0.00185833
\(688\) 1.43245 0.0546116
\(689\) 53.7869 2.04912
\(690\) 0.102254 0.00389275
\(691\) 6.46933 0.246105 0.123052 0.992400i \(-0.460732\pi\)
0.123052 + 0.992400i \(0.460732\pi\)
\(692\) −22.3264 −0.848723
\(693\) 5.80529 0.220525
\(694\) 1.68464 0.0639480
\(695\) −42.7324 −1.62093
\(696\) −0.140205 −0.00531446
\(697\) 29.2941 1.10959
\(698\) −9.77111 −0.369842
\(699\) 0.0332076 0.00125603
\(700\) 24.8666 0.939871
\(701\) 13.5910 0.513325 0.256663 0.966501i \(-0.417377\pi\)
0.256663 + 0.966501i \(0.417377\pi\)
\(702\) −0.124028 −0.00468114
\(703\) 4.57830 0.172674
\(704\) −3.77907 −0.142429
\(705\) −0.376339 −0.0141738
\(706\) 1.03213 0.0388447
\(707\) 10.9033 0.410060
\(708\) −0.0196346 −0.000737914 0
\(709\) 9.54923 0.358629 0.179314 0.983792i \(-0.442612\pi\)
0.179314 + 0.983792i \(0.442612\pi\)
\(710\) −0.0917629 −0.00344380
\(711\) −16.2246 −0.608469
\(712\) −30.9034 −1.15815
\(713\) −51.4342 −1.92623
\(714\) −0.0259950 −0.000972840 0
\(715\) 15.8775 0.593785
\(716\) −7.50559 −0.280497
\(717\) 0.155899 0.00582215
\(718\) −2.21167 −0.0825387
\(719\) −6.51267 −0.242881 −0.121441 0.992599i \(-0.538751\pi\)
−0.121441 + 0.992599i \(0.538751\pi\)
\(720\) −30.1806 −1.12476
\(721\) 32.3561 1.20500
\(722\) 0.0115268 0.000428984 0
\(723\) −0.111585 −0.00414987
\(724\) −28.4841 −1.05860
\(725\) 57.7157 2.14351
\(726\) 0.00452927 0.000168097 0
\(727\) 3.58509 0.132964 0.0664818 0.997788i \(-0.478823\pi\)
0.0664818 + 0.997788i \(0.478823\pi\)
\(728\) −14.6937 −0.544584
\(729\) −26.9942 −0.999785
\(730\) −3.83714 −0.142019
\(731\) 1.46905 0.0543347
\(732\) −0.0187631 −0.000693505 0
\(733\) −17.0361 −0.629243 −0.314622 0.949217i \(-0.601878\pi\)
−0.314622 + 0.949217i \(0.601878\pi\)
\(734\) 1.41465 0.0522156
\(735\) 0.117438 0.00433176
\(736\) −29.7895 −1.09806
\(737\) 6.10340 0.224822
\(738\) 12.9409 0.476361
\(739\) 41.5324 1.52779 0.763897 0.645339i \(-0.223284\pi\)
0.763897 + 0.645339i \(0.223284\pi\)
\(740\) 6.61552 0.243191
\(741\) 0.206171 0.00757389
\(742\) 9.96024 0.365652
\(743\) 18.1772 0.666855 0.333428 0.942776i \(-0.391795\pi\)
0.333428 + 0.942776i \(0.391795\pi\)
\(744\) 0.136742 0.00501320
\(745\) 69.1665 2.53406
\(746\) 1.61975 0.0593031
\(747\) −32.7785 −1.19930
\(748\) −5.36593 −0.196198
\(749\) 19.7825 0.722837
\(750\) 0.0331250 0.00120955
\(751\) 45.6729 1.66663 0.833314 0.552799i \(-0.186440\pi\)
0.833314 + 0.552799i \(0.186440\pi\)
\(752\) 30.1668 1.10007
\(753\) −0.267649 −0.00975366
\(754\) −16.1982 −0.589905
\(755\) −36.8356 −1.34058
\(756\) 0.217855 0.00792329
\(757\) −22.2550 −0.808873 −0.404436 0.914566i \(-0.632532\pi\)
−0.404436 + 0.914566i \(0.632532\pi\)
\(758\) 9.31560 0.338358
\(759\) −0.0673013 −0.00244288
\(760\) −25.2100 −0.914462
\(761\) −14.1456 −0.512779 −0.256390 0.966573i \(-0.582533\pi\)
−0.256390 + 0.966573i \(0.582533\pi\)
\(762\) 0.0547042 0.00198172
\(763\) −15.5617 −0.563372
\(764\) 26.5306 0.959844
\(765\) −30.9517 −1.11906
\(766\) −1.93302 −0.0698427
\(767\) −4.77601 −0.172452
\(768\) −0.0293254 −0.00105819
\(769\) −13.7367 −0.495357 −0.247678 0.968842i \(-0.579668\pi\)
−0.247678 + 0.968842i \(0.579668\pi\)
\(770\) 2.94019 0.105957
\(771\) 0.247388 0.00890945
\(772\) 35.5574 1.27974
\(773\) −36.9060 −1.32742 −0.663709 0.747991i \(-0.731019\pi\)
−0.663709 + 0.747991i \(0.731019\pi\)
\(774\) 0.648964 0.0233265
\(775\) −56.2901 −2.02200
\(776\) −29.4047 −1.05557
\(777\) −0.0210937 −0.000756731 0
\(778\) −7.90414 −0.283377
\(779\) −43.0240 −1.54149
\(780\) 0.297912 0.0106669
\(781\) 0.0603962 0.00216115
\(782\) −8.40595 −0.300596
\(783\) 0.505643 0.0180702
\(784\) −9.41362 −0.336201
\(785\) −24.5353 −0.875701
\(786\) −0.0860665 −0.00306989
\(787\) −50.6675 −1.80610 −0.903051 0.429534i \(-0.858678\pi\)
−0.903051 + 0.429534i \(0.858678\pi\)
\(788\) 7.55838 0.269256
\(789\) 0.155955 0.00555215
\(790\) −8.21722 −0.292356
\(791\) 9.75001 0.346670
\(792\) −4.99079 −0.177340
\(793\) −4.56403 −0.162073
\(794\) −11.1834 −0.396885
\(795\) −0.425174 −0.0150794
\(796\) 26.3841 0.935160
\(797\) 47.1764 1.67107 0.835536 0.549435i \(-0.185157\pi\)
0.835536 + 0.549435i \(0.185157\pi\)
\(798\) 0.0381787 0.00135151
\(799\) 30.9375 1.09449
\(800\) −32.6019 −1.15265
\(801\) 55.7247 1.96894
\(802\) 10.8964 0.384767
\(803\) 2.52552 0.0891236
\(804\) 0.114519 0.00403877
\(805\) −43.6889 −1.53983
\(806\) 15.7981 0.556464
\(807\) −0.0528384 −0.00186000
\(808\) −9.37353 −0.329760
\(809\) −9.36222 −0.329158 −0.164579 0.986364i \(-0.552627\pi\)
−0.164579 + 0.986364i \(0.552627\pi\)
\(810\) −13.6727 −0.480408
\(811\) −48.1058 −1.68922 −0.844611 0.535380i \(-0.820168\pi\)
−0.844611 + 0.535380i \(0.820168\pi\)
\(812\) 28.4521 0.998472
\(813\) 0.142038 0.00498150
\(814\) 0.459042 0.0160894
\(815\) 17.8490 0.625223
\(816\) −0.0889481 −0.00311381
\(817\) −2.15758 −0.0754841
\(818\) −11.5080 −0.402369
\(819\) 26.4955 0.925828
\(820\) −62.1684 −2.17102
\(821\) 12.1493 0.424014 0.212007 0.977268i \(-0.432000\pi\)
0.212007 + 0.977268i \(0.432000\pi\)
\(822\) −0.101656 −0.00354566
\(823\) −52.0806 −1.81541 −0.907707 0.419604i \(-0.862169\pi\)
−0.907707 + 0.419604i \(0.862169\pi\)
\(824\) −27.8164 −0.969032
\(825\) −0.0736552 −0.00256435
\(826\) −0.884420 −0.0307729
\(827\) −17.3050 −0.601753 −0.300876 0.953663i \(-0.597279\pi\)
−0.300876 + 0.953663i \(0.597279\pi\)
\(828\) 35.2229 1.22408
\(829\) −32.5453 −1.13034 −0.565172 0.824973i \(-0.691190\pi\)
−0.565172 + 0.824973i \(0.691190\pi\)
\(830\) −16.6012 −0.576237
\(831\) −0.125044 −0.00433772
\(832\) −17.2478 −0.597960
\(833\) −9.65414 −0.334496
\(834\) −0.0556355 −0.00192650
\(835\) 78.8449 2.72854
\(836\) 7.88089 0.272566
\(837\) −0.493152 −0.0170458
\(838\) −9.18348 −0.317238
\(839\) −10.1679 −0.351035 −0.175517 0.984476i \(-0.556160\pi\)
−0.175517 + 0.984476i \(0.556160\pi\)
\(840\) 0.116150 0.00400757
\(841\) 37.0375 1.27716
\(842\) 10.7700 0.371157
\(843\) −0.297559 −0.0102485
\(844\) 20.6787 0.711789
\(845\) 27.2405 0.937103
\(846\) 13.6669 0.469878
\(847\) −1.93516 −0.0664931
\(848\) 34.0813 1.17036
\(849\) 0.0417575 0.00143311
\(850\) −9.19955 −0.315542
\(851\) −6.82101 −0.233821
\(852\) 0.00113322 3.88235e−5 0
\(853\) −10.7159 −0.366907 −0.183453 0.983028i \(-0.558728\pi\)
−0.183453 + 0.983028i \(0.558728\pi\)
\(854\) −0.845165 −0.0289210
\(855\) 45.4584 1.55465
\(856\) −17.0070 −0.581287
\(857\) −10.1298 −0.346027 −0.173014 0.984919i \(-0.555350\pi\)
−0.173014 + 0.984919i \(0.555350\pi\)
\(858\) 0.0206717 0.000705721 0
\(859\) −8.76656 −0.299111 −0.149556 0.988753i \(-0.547784\pi\)
−0.149556 + 0.988753i \(0.547784\pi\)
\(860\) −3.11764 −0.106311
\(861\) 0.198225 0.00675549
\(862\) −14.8779 −0.506744
\(863\) 0.329472 0.0112153 0.00560767 0.999984i \(-0.498215\pi\)
0.00560767 + 0.999984i \(0.498215\pi\)
\(864\) −0.285623 −0.00971708
\(865\) 42.9292 1.45964
\(866\) 11.4539 0.389218
\(867\) 0.0850799 0.00288946
\(868\) −27.7493 −0.941871
\(869\) 5.40838 0.183467
\(870\) 0.128043 0.00434108
\(871\) 27.8561 0.943868
\(872\) 13.3784 0.453049
\(873\) 53.0224 1.79454
\(874\) 12.3458 0.417601
\(875\) −14.1529 −0.478456
\(876\) 0.0473866 0.00160105
\(877\) 19.8266 0.669497 0.334748 0.942308i \(-0.391349\pi\)
0.334748 + 0.942308i \(0.391349\pi\)
\(878\) 13.6649 0.461169
\(879\) −0.0204136 −0.000688535 0
\(880\) 10.0605 0.339141
\(881\) 43.9146 1.47952 0.739761 0.672870i \(-0.234939\pi\)
0.739761 + 0.672870i \(0.234939\pi\)
\(882\) −4.26480 −0.143603
\(883\) −1.12961 −0.0380143 −0.0190071 0.999819i \(-0.506051\pi\)
−0.0190071 + 0.999819i \(0.506051\pi\)
\(884\) −24.4902 −0.823696
\(885\) 0.0377534 0.00126907
\(886\) 1.85551 0.0623370
\(887\) −30.5280 −1.02503 −0.512515 0.858678i \(-0.671286\pi\)
−0.512515 + 0.858678i \(0.671286\pi\)
\(888\) 0.0181342 0.000608543 0
\(889\) −23.3728 −0.783898
\(890\) 28.2228 0.946029
\(891\) 8.99903 0.301479
\(892\) −6.92702 −0.231934
\(893\) −45.4377 −1.52051
\(894\) 0.0900513 0.00301176
\(895\) 14.4317 0.482399
\(896\) −20.9601 −0.700226
\(897\) −0.307165 −0.0102560
\(898\) −8.06605 −0.269168
\(899\) −64.4063 −2.14807
\(900\) 38.5483 1.28494
\(901\) 34.9520 1.16442
\(902\) −4.31379 −0.143634
\(903\) 0.00994063 0.000330803 0
\(904\) −8.38206 −0.278783
\(905\) 54.7692 1.82059
\(906\) −0.0479581 −0.00159330
\(907\) −6.59359 −0.218937 −0.109468 0.993990i \(-0.534915\pi\)
−0.109468 + 0.993990i \(0.534915\pi\)
\(908\) 18.4416 0.612006
\(909\) 16.9023 0.560613
\(910\) 13.4191 0.444839
\(911\) −25.2887 −0.837850 −0.418925 0.908021i \(-0.637593\pi\)
−0.418925 + 0.908021i \(0.637593\pi\)
\(912\) 0.130637 0.00432583
\(913\) 10.9265 0.361616
\(914\) −12.4596 −0.412126
\(915\) 0.0360777 0.00119269
\(916\) −8.49760 −0.280769
\(917\) 36.7725 1.21434
\(918\) −0.0805964 −0.00266008
\(919\) −39.4731 −1.30210 −0.651049 0.759036i \(-0.725671\pi\)
−0.651049 + 0.759036i \(0.725671\pi\)
\(920\) 37.5592 1.23829
\(921\) −0.244204 −0.00804680
\(922\) 14.2837 0.470410
\(923\) 0.275650 0.00907313
\(924\) −0.0363097 −0.00119450
\(925\) −7.46497 −0.245447
\(926\) 7.77272 0.255428
\(927\) 50.1584 1.64742
\(928\) −37.3027 −1.22452
\(929\) 51.4929 1.68943 0.844713 0.535219i \(-0.179771\pi\)
0.844713 + 0.535219i \(0.179771\pi\)
\(930\) −0.124881 −0.00409500
\(931\) 14.1790 0.464696
\(932\) 5.79340 0.189769
\(933\) −0.226765 −0.00742395
\(934\) −4.47778 −0.146517
\(935\) 10.3176 0.337421
\(936\) −22.7781 −0.744526
\(937\) 5.68848 0.185835 0.0929173 0.995674i \(-0.470381\pi\)
0.0929173 + 0.995674i \(0.470381\pi\)
\(938\) 5.15838 0.168427
\(939\) 0.0917943 0.00299559
\(940\) −65.6561 −2.14147
\(941\) −9.84589 −0.320967 −0.160483 0.987039i \(-0.551305\pi\)
−0.160483 + 0.987039i \(0.551305\pi\)
\(942\) −0.0319437 −0.00104078
\(943\) 64.0995 2.08737
\(944\) −3.02625 −0.0984960
\(945\) −0.418890 −0.0136265
\(946\) −0.216329 −0.00703346
\(947\) −9.33207 −0.303251 −0.151626 0.988438i \(-0.548451\pi\)
−0.151626 + 0.988438i \(0.548451\pi\)
\(948\) 0.101478 0.00329586
\(949\) 11.5265 0.374167
\(950\) 13.5113 0.438365
\(951\) −0.00573964 −0.000186120 0
\(952\) −9.54830 −0.309462
\(953\) −2.64276 −0.0856074 −0.0428037 0.999084i \(-0.513629\pi\)
−0.0428037 + 0.999084i \(0.513629\pi\)
\(954\) 15.4404 0.499900
\(955\) −51.0130 −1.65074
\(956\) 27.1981 0.879650
\(957\) −0.0842753 −0.00272423
\(958\) 16.3955 0.529716
\(959\) 43.4333 1.40254
\(960\) 0.136340 0.00440036
\(961\) 31.8154 1.02630
\(962\) 2.09508 0.0675482
\(963\) 30.6668 0.988225
\(964\) −19.4670 −0.626991
\(965\) −68.3697 −2.20090
\(966\) −0.0568807 −0.00183011
\(967\) −38.0052 −1.22217 −0.611083 0.791567i \(-0.709266\pi\)
−0.611083 + 0.791567i \(0.709266\pi\)
\(968\) 1.66366 0.0534720
\(969\) 0.133975 0.00430390
\(970\) 26.8541 0.862234
\(971\) −0.160161 −0.00513981 −0.00256991 0.999997i \(-0.500818\pi\)
−0.00256991 + 0.999997i \(0.500818\pi\)
\(972\) 0.506580 0.0162486
\(973\) 23.7707 0.762053
\(974\) 10.1042 0.323761
\(975\) −0.336165 −0.0107659
\(976\) −2.89193 −0.0925684
\(977\) 20.4963 0.655735 0.327867 0.944724i \(-0.393670\pi\)
0.327867 + 0.944724i \(0.393670\pi\)
\(978\) 0.0232385 0.000743085 0
\(979\) −18.5756 −0.593678
\(980\) 20.4882 0.654471
\(981\) −24.1238 −0.770213
\(982\) 1.47356 0.0470233
\(983\) 10.2845 0.328024 0.164012 0.986458i \(-0.447556\pi\)
0.164012 + 0.986458i \(0.447556\pi\)
\(984\) −0.170414 −0.00543258
\(985\) −14.5332 −0.463067
\(986\) −10.5260 −0.335216
\(987\) 0.209346 0.00666354
\(988\) 35.9686 1.14431
\(989\) 3.21448 0.102214
\(990\) 4.55788 0.144859
\(991\) 9.85979 0.313207 0.156603 0.987662i \(-0.449946\pi\)
0.156603 + 0.987662i \(0.449946\pi\)
\(992\) 36.3812 1.15511
\(993\) 0.0212041 0.000672890 0
\(994\) 0.0510448 0.00161904
\(995\) −50.7313 −1.60829
\(996\) 0.205016 0.00649618
\(997\) −26.1240 −0.827356 −0.413678 0.910423i \(-0.635756\pi\)
−0.413678 + 0.910423i \(0.635756\pi\)
\(998\) 1.52932 0.0484098
\(999\) −0.0654000 −0.00206916
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 671.2.a.c.1.8 19
3.2 odd 2 6039.2.a.k.1.12 19
11.10 odd 2 7381.2.a.i.1.12 19
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
671.2.a.c.1.8 19 1.1 even 1 trivial
6039.2.a.k.1.12 19 3.2 odd 2
7381.2.a.i.1.12 19 11.10 odd 2